Ask a New Question
Menu

Integrate : ∫(cot⁡2x-csc2x)^2dx

1 answer

recall that cot^2 x +1 = csc^2 x
so
∫(cot⁡^2 x-csc^2 x)^2dx
= ∫(cot⁡^2 x-(cot^2 + 1)^2dx
= ∫ -1 dx
take over
Similar Questions
  1. Please solve it in step by step.integrate: ∫(cot2x-csc2x)^2 dx
    1. answers icon 3 answers
  2. Please can anyone help with the following problems - thanks.1) Integrate X^4 e^x dx 2) Integrate Cos^5(x) dx 3) Integrate
    1. answers icon 0 answers
  3. Please do help solve the followings1) Integrate e^4 dx 2) Integrate dx/sqrt(90^2-4x^2) 3) Integrate (e^x+x)^2(e^x+1) dx 4)
    1. answers icon 0 answers
  4. Verify the identities.1.) √1-COSθ/1+COSθ= 1+SINθ/SINθ 2.) SEC X SIN(π/2-X)= 1 3.) CSC X(CSC X-SIN X)+SIN X-COS X/SIN X +
    1. answers icon 1 answer
more similar questions